If you're good with long division, here's a quick way to find pretty accurate square roots without the aid of a calculator. Let's try 24.6.

Make a guess. It can be a very bad guess. It doesn't matter. You can even guess 1. Let's try 5 since \(5^{2}\) is 25, which is pretty close to 24.6.

Divide 24.6 by 5. \( \frac{24.6}{5} = 4.92 \).

Now, comes the trick: Pick a new guess between 5 and 4.92 and divide it into 24.6 again. Let's try 4.95. \( \frac{24.6}{4.95} = 4.96 \). 4.96 is pretty close to 4.9598 which is the actual square root of 24.6.

Repeat steps 2 and 3 to any desired level of accuracy. The further you go, the harder the long division becomes. But the first few cycles yield a pretty close answer.

The reason this works is because \(n^{2}\) = 24.6 and \( n = \frac{24.6}{n}\). Therefore, the real square root will always be somewhere between \( \frac{24.6}{n}\) and \(n\).